≤SP Can Have Infinitely Many Classes

Abstract

Building off of recent results on Keisler's order, we show that consistently, ≤SP has infinitely many classes. In particular, we define the property of ≤ k-type amalgamation for simple theories, for each 2 ≤ k < ω. If we let Tn, k be the theory of the random k-ary, n-clique free random hyper-graph, then Tn, k has ≤ k-1-type amalgamation but not ≤ k-type amalgamation. We show that consistently, if T has ≤ k-type amalgamation then Tk+1, k ≤SP T, thus producing infinitely many ≤SP-classes. The same construction gives a simplified proof of Shelah's theorem that consistently, the maximal ≤SP-class is exactly the class of unsimple theories. Finally, we show that consistently, if T has <0-type amalgamation, then T ≤SP Trg, the theory of the random graph.